Millie wants to take swimming lessons.%C2%A0 She can purchase two different swim lesson packages.%C2%A0 Package A is 20 lessons for $250.%C2%A0 Package B is 15 lessons for $180.%C2%A0 If Millie wants the better buy, which package should she choose?%C2%A0%C2%A0(6.RP.3.d)%C2%A0(1 point)
To determine which package is the better buy, we need to calculate the cost per lesson for each package.
For Package A:
Cost per lesson = $250 / 20 = $12.50
For Package B:
Cost per lesson = $180 / 15 = $12
So, Millie should choose Package B because the cost per lesson is lower.
To determine which swim lesson package is the better buy, we need to compare the cost per lesson for each package.
Package A: 20 lessons for $250
Cost per lesson = $250 ÷ 20 = $12.50 per lesson
Package B: 15 lessons for $180
Cost per lesson = $180 ÷ 15 = $12.00 per lesson
Comparing the cost per lesson, we can see that Package B has a lower cost per lesson at $12.00, while Package A has a cost per lesson of $12.50.
Therefore, Millie should choose Package B as it is the better buy with a lower cost per lesson.
To determine the better buy, we need to compare the cost per lesson for each package.
For Package A:
Cost = $250
Number of lessons = 20
Cost per lesson = Total cost / Number of lessons = $250 / 20 = $12.50
For Package B:
Cost = $180
Number of lessons = 15
Cost per lesson = Total cost / Number of lessons = $180 / 15 = $12
Therefore, Package B has a lower cost per lesson ($12) compared to Package A ($12.50).
So, Millie should choose Package B as it offers a better buy.